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    If the set of unstable periodic points is dense in K, ape... — Carmelics
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    Supports→Density of unstable periodic points in K guarantees an abundance of aperiodic orbits characteristic of chaos

    If the set of unstable periodic points is dense in K, aperiodic orbits of the kind characteristic of chaos will be abundant

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    Density of unstable periodic points in K guarantees an abundance of aperiodic or...Unstable periodic points are points where trajectories from neighboring points e...

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    Density of unstable periodic points in K guarantees an abundance of ap...94%Robinson (1995) argues that chaos can be characterized without requiri...78%Aperiodicity is a much better characterization of chaos than periodici...75%The lack of periodicity is precisely what is characteristic of chaos75%

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    Devaney’s definition has the virtues of being precise and compact. However, objections have been raised against it. Since the time he proposed his definition, it has been shown that (2) and (3) imply (1) if the set \(K\) has an infinite number of elements (see Banks et al. 1992), although this result does not hold for sets with finite elements. More to the point, the definition seems counterintuitive in that it emphasizes periodic orbits rather than aperiodicity, but the latter seems a much bett

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